Volume of the prism \(\displaystyle={l}\cdot{w}\cdot{h}={60}\cdot{20}\cdot{10}={12000}\)

lobeflepnoumni

Answered 2020-11-09
Author has **26012** answers

asked 2021-08-06

The height of a cylinder is increasing at a constant rate of 10 meters per minute, and the volume is increasing at a rate of 1135 cubic meters per minute. At the instant when the height of the cylinder is 9 meters and the volume is 354 cubic meters, what is the rate of change of the radius? The volume of a cylinder can be found with the equation \(\displaystyle{V}=\pi{r}^{{2}}{h}\). Round answer to three decimal places

asked 2021-03-07

Find the length of a rectangular prism having a volume of 2,830.5 cubic meters, width of 18.5 meters, and height of 9 meters.

asked 2020-12-17

Salim built a rectangualr prism with a length of 5 inches, a width of 4 inches, and a height of 3 inches. Would the prism Natalie built with a length of 3 inches, a width of 4 inches, and a height of 5 inches have the same volume or a different volume than Salim's prism? Explain

asked 2021-08-07

asked 2021-08-06

Solve the formula for the indicated variable.

Formula for the volume of a cylinder, \(\displaystyle{V}=π{r}^{{2}}{h}\), for h

Formula for the volume of a cylinder, \(\displaystyle{V}=π{r}^{{2}}{h}\), for h

asked 2021-08-09

The volume of a cube is increasing at the rate of 1200 cm³/min at the instant its edges are 20 cm long. At what rate are the edges changing at that instant?

asked 2021-08-16

The volume of a can (right circular cylinder) is 10 cubic feet. The curved surface area is the area of the side. Write the curved surface area S as a function of the radius r. Write the radius r as a function of the curved surface area S.